Back to Search Start Over

Linear evolution equations on the half-line with dynamic boundary conditions

Authors :
David A. Smith
Toh Wei Yang
Source :
European Journal of Applied Mathematics. 33:505-537
Publication Year :
2021
Publisher :
Cambridge University Press (CUP), 2021.

Abstract

The classical half-line Robin problem for the heat equation may be solved via a spatial Fourier transform method. In this work, we study the problem in which the static Robin condition$$bq(0,t) + {q_x}(0,t) = 0$$is replaced with a dynamic Robin condition;$$b = b(t)$$is allowed to vary in time. Applications include convective heating by a corrosive liquid. We present a solution representation and justify its validity, via an extension of the Fokas transform method. We show how to reduce the problem to a variable coefficient fractional linear ordinary differential equation for the Dirichlet boundary value. We implement the fractional Frobenius method to solve this equation and justify that the error in the approximate solution of the original problem converges appropriately. We also demonstrate an argument for existence and unicity of solutions to the original dynamic Robin problem for the heat equation. Finally, we extend these results to linear evolution equations of arbitrary spatial order on the half-line, with arbitrary linear dynamic boundary conditions.

Details

ISSN :
14694425 and 09567925
Volume :
33
Database :
OpenAIRE
Journal :
European Journal of Applied Mathematics
Accession number :
edsair.doi...........d59e597a3202a56afb619434e3560fa5